We consider a formulation of a non zero-sum n players game by an n+1 players zero-sum game. We suppose the existence of the n+1-th player in addition to n players in the main game, and virtual subsidies to the n players which is provided by the n+1-th player. Its strategic variable affects only the subsidies, and does not affect choice of strategies by the n players in the main game. His objective function is the opposite of the sum of the payoffs of the n players. We will show 1) The minimax theorem by Sion (Sion(1958)) implies the existence of Nash equilibrium in the n players non zero-sum game. 2) The maximin strategy of each player in {1, 2, ..., n} with the minimax strategy of the n+1-th player is equivalent to the Nash equilibrium st...
We consider the relation between Sion's minimax theorem for a continuous function and a Nash equilib...
Zero-sum games are a well known class of game theoretic models, which are widely used in several eco...
We prove a generalization of von Neumann's minmax theorem to the class of separable multiplayer zero...
We consider a formulation of a non zero-sum n players game by an n+1 players zero-sum game. We supp...
About a symmetric multi-person zero-sum game we will show the following results. 1. The existence...
We consider the relation between Sion's minimax theorem for a continuous function and Nash equilibri...
We consider a symmetric three-players zero-sum game with two strategic variables. Three players are ...
We consider a partially asymmetric multi-players zero-sum game with two strategic variables. All but...
We show that in zero-sum polymatrix games, a multiplayer generalization of two-person zero-sum games...
We consider a Stackelberg type dynamic two-players zero-sum game. One of two players is the leader a...
1 Introduction to noncooperative game theory To introduce a static two-player zero-sum (noncooperati...
A two-person zero-sum game is represented by Γ = (N, X, Y, g) where • N = {1, 2}: the set of players...
We consider a symmetric multi-person zero-sum game with two sets of alternative strategic variables ...
We explain the concept and theory behind game theory and simulation. How game theory can be used to ...
textabstractIn this chapter we give an overview on the theory of noncooperative games. In the first ...
We consider the relation between Sion's minimax theorem for a continuous function and a Nash equilib...
Zero-sum games are a well known class of game theoretic models, which are widely used in several eco...
We prove a generalization of von Neumann's minmax theorem to the class of separable multiplayer zero...
We consider a formulation of a non zero-sum n players game by an n+1 players zero-sum game. We supp...
About a symmetric multi-person zero-sum game we will show the following results. 1. The existence...
We consider the relation between Sion's minimax theorem for a continuous function and Nash equilibri...
We consider a symmetric three-players zero-sum game with two strategic variables. Three players are ...
We consider a partially asymmetric multi-players zero-sum game with two strategic variables. All but...
We show that in zero-sum polymatrix games, a multiplayer generalization of two-person zero-sum games...
We consider a Stackelberg type dynamic two-players zero-sum game. One of two players is the leader a...
1 Introduction to noncooperative game theory To introduce a static two-player zero-sum (noncooperati...
A two-person zero-sum game is represented by Γ = (N, X, Y, g) where • N = {1, 2}: the set of players...
We consider a symmetric multi-person zero-sum game with two sets of alternative strategic variables ...
We explain the concept and theory behind game theory and simulation. How game theory can be used to ...
textabstractIn this chapter we give an overview on the theory of noncooperative games. In the first ...
We consider the relation between Sion's minimax theorem for a continuous function and a Nash equilib...
Zero-sum games are a well known class of game theoretic models, which are widely used in several eco...
We prove a generalization of von Neumann's minmax theorem to the class of separable multiplayer zero...